Question 13 (15 marks) Use the Question 13 Writing Booklet - HSC - SSCE Mathematics Extension 1 - Question 13 - 2018 - Paper 1

The function f(x) = \frac{−x}{x^2 + 1} for x ≥ 1 has the following:

• Domain: For the inverse function f^{−1}(x), based on the original function behavior, the domain is all real numbers where the function is valid:

  $(-\infty, 0)$.

• Range: The range of the inverse function is the output values that the original function can take, which gives:

  $[−\frac{1}{2}, +\infty).$

To sketch the graph of f^{−1}(x):

1. Identify key points from the domain and range derived earlier.
2. Start by plotting points:
   • When x approaches −∞, f^{−1}(x) approaches −1.
   • At x = 0, y = −1/2.
3. The graph will start from (−∞, −1) to (0, −1/2).
4. Plot these points, and connect them smoothly to illustrate the curve.

The sketch should reflect an increasing function beginning from (−∞, −1) to (0, −1/2) showing the range.

Note: use the properties of the original function to guide the shape of the inverse.

To find the expression for the inverse function, start with:

Given:

$y = f(x) = \frac{−x}{x^2 + 1}$

1. Replace f(x) with y:

   $y = \frac{−x}{x^2 + 1}$

2. Solve for x:

   x^2 y + x + y = 0.$$

3. Apply the quadratic formula:

   $x = \frac{−b \pm \sqrt{b^2 − 4ac}}{2a}$ where a = y, b = 1, and c = y:

4. This gives:

   $x = \frac{−1 \pm \sqrt{1 − 4y^2}}{2y}$

5. Select the positive root because we're considering x ≥ 1.

Thus, the expression for f^{−1}(x) is:

$f^{−1}(x) = \frac{−1 + \sqrt{1 − 4x^2}}{2x}$.